Spread of wave packets in disordered hierarchical lattices

Abstract

We consider the spreading of the wave packet in the generalized Rosenzweig-Porter random matrix ensemble in the region of non-ergodic extended states 1<γ<2. We show that despite non-trivial fractal dimensions 0 < Dq=2-γ<1 characterize wave function statistics in this region, the wave packet spreading r2 tβ is governed by the "diffusion" exponent β=1 outside the ballistic regime t>τ 1 and r2 t2 in the ballistic regime for t<τ 1. This demonstrates that the multifractality exhibits itself only in local quantities like the wave packet survival probability but not in the large-distance spreading of the wave packet.